Add to ORKGThe Zariski closure of the boundary of the set of matrices of nonnegative rank at most 3 is reducible. We give a minimal generating set for the ideal of each irreducible component. In fact, this generating set is a Grobner basis with respect to the graded reverse lexicographic order. This solves a conjecture by Robeva, Sturmfels and the last author
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...
AbstractLet A be a (0, 1)-matrix of order n ⩾ 3 and let si0(A), i = 1, …, n, be the number of the of...
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
\u3cp\u3eUnderstanding the boundary of the set of matrices of nonnegative rank at most r is importan...
The Zariski closure of the boundary of the set of matrices of nonnegative rank at most 3 is reducibl...
The Zariski closure of the boundary of the set of matrices of nonnegative rank at most 3 is reducibl...
It is an open question whether tight closure commutes with localization in quotients of a polynomial...
We introduce the notion of Gröbner S-basis of an ideal of the free associative algebra K over a fiel...
We introduce the notion of Gröbner S-basis of an ideal of the free associative algebra K over a fiel...
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...
AbstractLet A be a (0, 1)-matrix of order n ⩾ 3 and let si0(A), i = 1, …, n, be the number of the of...
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
Understanding the boundary of the set of matrices of nonnegative rank at most r is important for app...
\u3cp\u3eUnderstanding the boundary of the set of matrices of nonnegative rank at most r is importan...
The Zariski closure of the boundary of the set of matrices of nonnegative rank at most 3 is reducibl...
The Zariski closure of the boundary of the set of matrices of nonnegative rank at most 3 is reducibl...
It is an open question whether tight closure commutes with localization in quotients of a polynomial...
We introduce the notion of Gröbner S-basis of an ideal of the free associative algebra K over a fiel...
We introduce the notion of Gröbner S-basis of an ideal of the free associative algebra K over a fiel...
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...
AbstractLet A be a (0, 1)-matrix of order n ⩾ 3 and let si0(A), i = 1, …, n, be the number of the of...
We study the degree of nonhomogeneous lattice ideals over arbitrary fields, and give formulas to com...